Relating The Polyakov Action to the Regge Action

As to the Regge Action that I described last Friday, the just mentioned Action happens through what is known of as the Regge Slope.  The contraction of the directly related superstrings during the Regge Action is equal in scalar amplitude to the manner that it was contracted during the Polyakov Action.  The slope of the motion of superstrings during the Regge Action is roughly equal in scalar amplitude -- yet in an isometrical assymetric manner -- to the Laplacian-based slope of the light-cone-gauge that is borne between a given arbitrary superstring and its directly corresponding Fadeev-Popov-Trace.  So, when a Kaeler-Metric is acting upon a given arbitrary superstring, the slope of the activity of the said string is equal in an inverse-based scalar amplitude as to how this would act if there were to be no Kaeler-Metric acting upon it, yet, this kinematic action that happens over the course of the projection of a slope will then here be spaced further in the relatively forward-holomorphic direction of the trajectory of the just mentioned superstring than if there were no Kaeler-Metric acting upon the said string.  This happens, as a general example, in each case in which there is a superstring leaving BRST in order to  go into the generally unnoticed portion of Ultimon Flow.  I will continue with the suspense later!  Sincererly, Sam Roach.